On Various Definitions of Capacity and Related Notions

Makoto Ohtsuka

doi:10.1017/S0027763000012411

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The electric capacity of a conductor in the 3-dimensional euclidean space is defined as the ratio of a positive charge given to the conductor and the potential on its surface. The notion of capacity was defined mathematically first by N. Wiener [7] and developed by C. de la Vallée Poussin, O. Frostman and others. For the history we refer to Frostman’s thesis [2]. Recently studies were made on different definitions of capacity and related notions. We refer to M. Ohtsuka [4] and G. Choquet [1], for instance. In the present paper we shall investigate further some relations among various kinds of capacity and related notions. A part of the results was announced in a lecture of the author in 1962.

References

[l] Choquet, G.: Diamètre transfini et comparaison de diverses capacités, Sém. Theorie du potentiel, 3 (1958/59), n° 4, 7 pp.Google Scholar

[2] Frostman, O.: Potentiel d’équilibre et capacité des ensembles, Thèse, Lund, 1935, 118 pp.Google Scholar

[3] Fuglede, B.: Le théorème du minimax et la théorie fine du potentiel, Ann. Inst. Fourier, 15 (1965), pp. 65–87.Google Scholar

[4] Ohtsuka, M.: Selected topics in function theory, Tokyo, 1957, in Japanese.Google Scholar

[5] Ohtsuka, M.: An application of the minimax theorem to the theory of capacity, J. Sci. Hiroshima Univ. Ser. A-I Math., 29 (1965), pp. 217–221.Google Scholar

[6] Ohtsuka, M.: Generalized capacity and duality theorem in linear programming, ibid., 30 (1966), pp. 45–56.Google Scholar

[7] Wiener, N.: Certain notions in potential theory, J. Math. Phys. M.I.T., 3 (1924), pp. 24–51.CrossRef Google Scholar

Crossref Citations

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Yamasaki, Maretsugu 1969. Relations between capacities and maximum principle. Hiroshima Mathematical Journal, Vol. 33, Issue. 1,

Král, Josef 1975. Nonlinear Evolution Equations and Potential Theory. p. 95.

Farkas, Bálint and Révész, Szilárd György 2005. Rendezvous numbers in normed spaces. Bulletin of the Australian Mathematical Society, Vol. 72, Issue. 3, p. 423.

Farkas, Bálint and Révész, Szilárd Gy. 2006. Potential Theoretic Approach to Rendezvous Numbers. Monatshefte für Mathematik, Vol. 148, Issue. 4, p. 309.

Farkas, Bálint and Nagy, Béla 2008. Transfinite Diameter, Chebyshev Constant and Energy on Locally Compact Spaces. Potential Analysis, Vol. 28, Issue. 3, p. 241.

Erdélyi, Tamás and Saff, Edward B. 2013. Riesz polarization inequalities in higher dimensions. Journal of Approximation Theory, Vol. 171, Issue. , p. 128.

Borodachov, S. V. and Bosuwan, N. 2014. Asymptotics of Discrete Riesz d-Polarization on Subsets of d-Dimensional Manifolds. Potential Analysis, Vol. 41, Issue. 1, p. 35.

Pritsker, I.E. Saff, E.B. and Wise, W. 2014. Reverse triangle inequalities for Riesz potentials and connections with polarization. Journal of Mathematical Analysis and Applications, Vol. 410, Issue. 2, p. 868.

Jaraczewski, Manuel Rozgic̀, Marco and Stiemer, Marcus 2015. Numerical Mathematics and Advanced Applications - ENUMATH 2013. Vol. 103, Issue. , p. 509.

Reznikov, A. Saff, E. B. and Vlasiuk, O. V. 2017. A Minimum Principle for Potentials with Application to Chebyshev Constants. Potential Analysis, Vol. 47, Issue. 2, p. 235.

Borodachov, S. Hardin, D. Reznikov, A. and Saff, E. 2018. Optimal discrete measures for Riesz potentials. Transactions of the American Mathematical Society, Vol. 370, Issue. 10, p. 6973.

Reznikov, A. Saff, E. and Volberg, A. 2018. Covering and separation of Chebyshev points for non-integrable Riesz potentials. Journal of Complexity, Vol. 46, Issue. , p. 19.

Ambrus, Gergely and Nietert, Sloan 2019. Polarization, sign sequences and isotropic vector systems. Pacific Journal of Mathematics, Vol. 303, Issue. 2, p. 385.

Horváth, Á.P. 2020. Potential theory and quadratic programming. Bulletin des Sciences Mathématiques, Vol. 160, Issue. , p. 102841.

Hardin, Douglas P. Petrache, Mircea and Saff, Edward B. 2022. Unconstrained Polarization (Chebyshev) Problems: Basic Properties and Riesz Kernel Asymptotics. Potential Analysis, Vol. 56, Issue. 1, p. 21.

Borodachov, Sergiy 2022. Polarization Problem on a Higher-Dimensional Sphere for a Simplex. Discrete & Computational Geometry, Vol. 67, Issue. 2, p. 525.

Zorii, Natalia 2023. On the Theory of Capacities on Locally Compact Spaces and its Interaction with the Theory of Balayage. Potential Analysis, Vol. 59, Issue. 3, p. 1345.

Hardin, Douglas Petrache, Mircea and Saff, Edward B. 2023. Corrigendum to “Asymptotics for the Unconstrained Polarization (Chebyshev) Problem”. Potential Analysis, Vol. 59, Issue. 4, p. 2123.

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